A generalization of the Banach-Steinhaus theorem for finite part limits

Abstract

It is well known, as follows from the Banach-Steinhaus theorem, that if a sequence \yn\n=1∞ of linear continuous functionals in a Fr\'echet space converges pointwise to a linear functional Y, Y( x) =n→∞ yn,x for all x, then Y is actually continuous. In this article we prove that in a Fr\'echet space the continuity of Y still holds if Y is the finite part of the limit of yn,x as n→∞. We also show that the continuity of finite part limits holds for other classes of topological vector spaces, such as LF-spaces, DFS-spaces, and DFS-spaces, and give examples where it does not hold.